# Better way to convert weights to range using map or fold?

Is there a shorter / better way of writing the following? There's probably some library that does the conversion but am wondering if some kind of map or foldl could work?

``````(define (weights-to-range lw)
; '(1 4 6 6 6 6 6) -> (1 5 11 17 23 29 35)
(define (f x lw acc)
(if (null? lw)
acc
(let ([y (+ x (car lw))])
(f y (cdr lw) (append acc (list y))))))
(f (car lw) (cdr lw) (list(car lw))))
``````
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I guess the initial 0 in the output is implied? –  Adam Burry Sep 7 '13 at 5:06

In Racket I would probably write it using the `for/fold` list comprehension:

``````(define (weights-to-range weights)
(define-values (xs _)
(for/fold ([xs '()] [prev 0])
([weight (in-list weights)])
(define this (+ prev weight))
(values (cons this xs) this)))
(reverse xs))

(require rackunit)
(check-equal? (weights-to-range '(1 4 6 6 6 6 6))
'(1 5 11 17 23 29 35))
``````

It would be even simpler except that, since this supplies two accumulation values to the `fold/fold` -- `xs` and `prev` -- the `for/fold` form is going to return two values. So we need to tuck both into temporary vars using `define-values`, before passing the one we care about -- from `xs` -- to `reverse`. (The var for `prev` is named `_`. That's just a convention meaning "ignored", because we don't need it.)

Of course, the general idea here is to "fold" a list using a "sliding window" of pairs, with the cumulative result so far available to each step. In your case, the function is `+`, but it could be generalized:

``````(define (fold-slide f vs)
(define-values (xs _)
(for/fold ([xs '()] [prev 0])
([v (in-list vs)])
(define this (f prev v))
(values (cons this xs) this)))
(reverse xs))
``````

With such a `fold-slide` (for lack of a better name) function, you could have written simply:

``````(fold-slide + '(1 4 6 6 6 6 6)
``````

Such a `fold-slide` might be even more useful if it could handle "windows" of any size, not just 2.

p.s. It's entirely possible there is some SRFI that does something like this, or a more-elegant way to do it in Racket, that I don't know.

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I gave it a try and I came up with this exact solution. –  stchang Sep 7 '13 at 17:22

It's perfectly fine to have an accumulator while still building your answer directly (that is, instead of accumulating a reversed answer and then reversing it at the end).

``````;; weights-to-range : (listof number) -> (listof number)
;; Returns list of partial sums of input list.
(define (weights-to-range lw0)

;; helper : (listof number) number -> (listof number)
;; acc is the sum of elements seen so far
(define (helper lw acc)
(cond [(null? lw)
null]
[else
(let ([new-acc (+ acc (car lw))])
(cons new-acc (helper (cdr lw) new-acc)))]))

(helper lw0 0))
``````
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